On higher order regionally proximal relations and topological characteristic factors for group actions

Abstract

We study several aspects of higher-order regionally proximal relations for group actions. First, we develop an algebraic approach to study higher-order regionally proximal relations. To this end, we introduce a new topology on a subgroup of the universal minimal system, which can be seen as a higher-order analogue of the classical τ-topology. Using this topology, we obtain an algebraic characterization of the relation RP[d] for abelian actions. Then, we study higher-order regionally proximal relations via recurrence sets, extending results of Huang, Shao, and Ye for Z-actions to more general group actions under suitable assumptions. We then study topological characteristic factors and prove, modulo almost one-to-one factors, that the maximal factor of order d-1 is the topological characteristic factor of order d for cubic configurations for arbitrary group actions, and for arithmetic progressions for finitely generated abelian group actions. As a consequence, we show that RP[d] and AP[d] coincide on minimal points for finitely generated abelian group actions, and we apply this to obtain results on independence along arithmetic progressions.